Reserving R666(2k's) and S800(3k's) to n=100K.

[QUOTE=paleseptember;218618]Nice work rogue! I'm in awe at the work that you're putting in. You're putting my efforts with R603 (currently at ~19K) and S928 (at 12.8K) to shame![/QUOTE]

It isn't as much work as you might think. I use the script, then sieve, then put the .pfgw file into PRPNet. I kept doing that until I had an estimated ten days of work. It turned out to be about four days of work.

More reservations
 

Sierpinski base 920

Riesel bases 615, 746, 846, 866

And more
 

Riesel bases 665 and 737.

Sierpinski bases 737 and 983.

Reservations
 

Taking Riesel base 872.

Taking Sierpinksi bases 515, 773, 845, and 657.

Sierpinski bases 657 and 515
 

Primes found:

[code]
2*657^2+1
4*657^2+1
6*657^1+1
8*657^2368+1
10*657^1+1
12*657^3+1
14*657^1+1
16*657^1+1
18*657^1+1
20*657^25+1
22*657^4+1
24*657^2+1
26*657^8+1
28*657^1+1
30*657^2+1
32*657^1688+1
34*657^3+1
36*657^12+1
38*657^1+1
42*657^16+1
44*657^1+1
46*657^1+1
[/code]

[code]
2*515^1+1
4*515^122+1
6*515^2+1
8*515^11+1
10*515^4+1
12*515^186+1
14*515^1+1
16*515^94+1
18*515^2+1
20*515^1+1
22*515^254+1
24*515^37+1
26*515^2477+1
28*515^2+1
30*515^1+1
32*515^1+1
34*515^2+1
36*515^1+1
38*515^1+1
40*515^12+1
42*515^1331+1
[/code]

Both are proven.

Reservations
 

Taking Riesel bases 773 and 563.

Reservations
 

Riesel bases 528, 832, and 951.

Sierpinski base 951.

More reservations
 

Taking Riesel base 582.

Taking Sierpinski bases 844, 953, and 582.

R1019, k=2 at n=130k, no prime, continuing

S578 is complete to n=25K; 2 primes found for n=5K-25K; 7 k's remaining; base released.